Work backwards, always doing the opposite combine like and watch the negative signs Explanation: The goal is to get x a lost number by itself on one side of the inequality. When something is lost it ...

\displaystyle-{10.2}\le{x}\le{7} Explanation: Add \displaystyle{1} to both sides: \displaystyle-{101}+{1}\le{10}{x}-{1}+{1}\le{69}+{1} \displaystyle-{102}\le{10}{x}\le{70} Now ...

\displaystyle{x} lies between \displaystyle-\frac{{1}}{{3}} and \displaystyle\frac{{7}}{{3}} or \displaystyle-\frac{{1}}{{3}}{<}{x}{<}\frac{{7}}{{3}} or \displaystyle{\left(-{1}{/}{3},\frac{{7}}{{3}}\right)} ...

The solution is \displaystyle{x}\in{\left(\frac{{1}}{{2}},\frac{{5}}{{2}}\right)} Explanation: The inequality is \displaystyle{\left|{2}{x}-{3}\right|}{<}{2} Therefore, \displaystyle{2}{x}-{3}{<}{2} ...

\displaystyle{x}=-{1} \displaystyle{x}=-{4} Explanation: \displaystyle{2}{x}+{5}={3} or \displaystyle{2}{x}={3}-{5} or \displaystyle{2}{x}=-{2} or \displaystyle{x}=-\frac{{2}}{{2}} ...

MrsRudolph221 Sep 10, 2014 \displaystyle-{12}{<}-{2}{\left({x}+{1}\right)}\le{18} Step 1: Divide all three "parts" by -2 and switch the direction of the inequality symbols. \displaystyle{6}{>}{x}+{1}\ge-{9} ...